Fiber entropy and algorithmic complexity of random orbits

Abstract

Let be a finite alphabet. We consider a bundle of measure preserving transformations (Tθ)θ ∈ acting on a probability space (X,μ), which are chosen randomly according to an ergodic stochastic process (,,σ) with state space . This describes a paradigmatic case of a random dynamical system (RDS). Considering a finite partition P of X we show that the conditional algorithmic complexity of a random orbit x, Tα0(x),Tα1 Tα0(x),... in X along a sequence α = α0α1α2... in equals almost surely the fiber entropy of the RDS with respect to P, whenever the latter is ergodic. This extends a classical result of A. A. Brudno connecting algorithmic complexity and entropy in deterministic dynamical systems.